gmatnmein2010 wrote:For how many two digit positive numbers will tripling the tens digit give us a two digit number that is triple the original.
A) None
B) 1
C) 2
D) 3
E) 4
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Let the two digit positive number be xy.x-tens place,y-units place. [Suppose 63,x=6,y=3]
Thus the no. can be represented as 10x+y.
Now,tripling the tens digit means x should be replaced 3x.
Thus the no. now becomes 30x + y.
Now,according to the question,
30x+y=3(10x + y)
=>30x + y = 30x + 3y
=>y = 0,y should be 0.
Therefore,the tens place can be taken by:-
1(10 tripling gives 30)
2(20 tripling gives 60)
3(30 tripling gives 90)
For 40 and above,the no. chnages to a 3 digit number.[40 x 3=120(3 digit no.)]
Hence,the answer is
D.
